Archive 2018
Auzinger takes sweep in Science Slam
Created: July 11, 2018
Günter Auzinger, member of the Austrian Adaptive Optics (AAO) team at JKU Linz and RICAM, has won the Final European Science Slam in Toulouse last Saturday (July 7). This is his third success in a row, after having won the Upper Austrian Science Slam and the Austrian Science Slam Finals earlier this year. Congratulations! You can watch a German version of Günter's outstanding performance here:
Created: July 09, 2018
Peter Gangl received the Anile prize of the ECMI for his PhD thesis at the ECMI meeting 2018 in Budapest, Hungaria. More information here.
Created: July 09, 2018
Peter Gangl received the Richard C. DiPrima Prize of SIAM for his PhD thesis at the 2018 SIAM Annual Meeting 2018 in Portland, USA. Read an interview with him here
Created: May 28, 2018
The former RICAM PostDoc Peter Gangl will be awarded the Richard C. DiPrima Prize at the 2018 SIAM Annual Meeting in Portland, OR, in July. Congratulations!
Highlights of 2017 in the Journal "Inverse Problems"
Created: May 18, 2018
Created: April 17, 2018
JKU and RICAM announce a vacant professorship in "Mathematical Methods in Medicine and Life Sciences". More information can be found here.
Created: March 22, 2018
The project proposal by Stefan Takacs entitled 'Fast Solvers For Isogeometric Analysis' is funded by FWF.
Created: March 20, 2018
The project proposal of Wilfried Meidl entitled 'Bent Functions and Generalizations and APN Functions' is funded by FWF.
Problem arising from Mathematical Biology solved
Created: March 13, 2018
The Paper "The full Keller-Segel model is well-posed on nonsmooth domains" by Dirk Horstmann (University of Cologne), Hannes Meinlschmidt (Johann Radon Institute Linz) and Joachim Rehberg (WIAS) has been published in Nonlinearity. The Keller-Segel Model describes the interaction of bacteria and their surrounding agents. It was established by Keller and Segel in 1970 and is probably the most analysed model in Mathematical Biology. Their work was citated severel hundreds of times and it became an initial point of various analytical and numerical studies. The model is of high relevance for the description of clinical phenomena. The (full) Keller-Segel Model consists of four strongly coupled differential equations. While each of these equations is parabolic itself, the same does not hold necessarily for the whole system. The equations are applied for a prescribed spatial or planar area (like a Petri dish) containing the bacteria culture. In most cases this system is considered to be isolated from the outside world. For areas with smooth geometries (e.g. round or ellipsoid) it has been known for quite a long time that for given initial values for bacteria density and chemical agents, a unique solution exists at least for a short time interval. However, in practice the considered areas are typically nonsmooth. In particular at geometrically singular areas like corners or edges, exceptional effects like extra high concentrations are supposed to occur. Now for the first time the three authors could prove the existence of a solution for the Keller-Segel Model also for a huge class of non-smooth geometries like arbitrary two- and three-dimensional polyhedral areas.
Created: March 12, 2018
The project proposal by Kamran Sadiq entitled 'Weighted X-ray transform and applications' is funded by FWF.
Created: March 09, 2018
Former RICAM employee László Mérai will be awarded the venia docendi from Eötvös Loránd University Budapest.
Created: March 08, 2018
The project proposal by Mourad Sini entitled 'Mathematical Analysis of Imaging Modalities using Nanoparticles as Contrast Agents' is funded by the FWF. It will start on September 1st, 2018.

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